Inductors & Resonance

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Inductors & Resonance
The Inductor
This figure shows a conductor carrying a current. A magnetic field is set up around the
conductor as concentric circles.
If a coil of wire has a current flowing through
it, the magnetic flux due to each turn will link
with every other turn and produce the same
sort of magnetic field as a permanent magnet.
Such a coil is called a solenoid as shown here.
It acts as a magnet only when current is
flowing through it.
If a coil of wire has a current flowing
through it, the magnetic flux due to each turn
will link with every other turn and produce the
same sort of magnetic field as a permanent
magnet. Such a coil is called a solenoid as
shown here. It acts as a magnet only when
current is flowing through it.
The magnetic polarity of the solenoid can
be determined from the direction of current
flow as seen looking in the ends, as shown in
the diagram. From that the direction in which
the magnetic field is acting can also be found.
Solenoids or electro-magnets are widely
used in electronic equipment. Loudspeakers,
headphones, moving coil microphones,
measuring instruments, transformers and such
things, depend on electromagnetism for their
operation.
A inductor may be air-cored or have a
solid core.
Magnetic materials
Magnetic materials in common use for the cores of solenoids are:
o Soft iron: easy to magnetise and demagnetise. Used for motor pole-pieces.
o Silicon iron: used for transformer laminations and AC motors. Low-loss.
o Nickel iron alloy: also known as radio metal and mu-metal, is used for high-class audio
transformers and cathode-ray tube screens.
o Ferrites: iron oxide based materials used for a wide range of applications in radio and
electronics generally. The characteristics depend on the mix of materials in the core and
is extremely varied. Also known as ferroxdure and ferroxcube.
o Permanent magnets: tungsten steel, and alloys of iron, nickel, aluminium, cobalt,
ceramic, and titanium are used. Iron oxides can also be used.
The magnetic field surrounding a coil does not appear immediately the circuit is connected.
It takes time to grow from nothing at the moment of switch-on to its maximum. The time taken
for this depends on many factors, including the number of turns in the coil, the current, the core
material, and the self-resistance of the coil. Similarly, when the current is switched off the field
takes time to decay.
It should be noted that the current in the coil takes time to rise to its maximum. This must be
compared to the capacitor where at switch-on, the voltage across the capacitor takes time to rise
to its maximum (see below).
Inductors in series and parallel
A coil has inductance, measured in henries. The values of inductance used in radio range
from several henries (H) to parts of a microhenry (µH). The inductance of a coil depends on the
number of turns and the core details. When inductors are connected in series, the number of turns
is effectively increased.
So too is the inductance, and the effective
inductance of the circuit is the sum of the
individual inductances.
The diagram shows series and parallel
inductors. These calculations apply only to
inductors which are not coupled magnetically.
Where there is coupling between coils, the total
inductance is also affected by the amount of
coupling.
As with the resistor, you can visualize the resulting value of inductors like this:
o Putting two inductors in series in effect increases the number of turns so the inductance
value increases.
o Putting two inductors in parallel, in effect decreases the effective inductance
Like the resistor, we can use visualised examples to easily work out what happens with two
(or more) typical inductors of the same value. Put two in parallel, the value will halve. Put two in
series and the effective inductance value will be double.
In a perfect inductor there is no loss of energy. The energy is stored in the magnetic field
surrounding the inductor and (in an AC circuit) it changes in magnitude and sign twice in each
cycle. The opposition to the flow of current is called the inductive reactance and is denoted by
XL. Reactance is an opposition to current resulting from a storage of energy. The relationship is:
XL = 2π f L where f is the frequency in hertz, L is the inductance in henries, and XL is the
reactance expressed in ohms.
Note that as the frequency rises, the inductive reactance also rises.
In practice there is no such thing as a perfect inductor and it is usual to consider the
practical component to be a circuit containing both a resistor R (the inductor's resistance) and L
the inductor. Where resistance and inductance (inductive reactance) exist in a circuit together,
they are combined into a term, called
impedance, representing their combined total
opposition to current flow.
Reactances can be added together directly.
But resistances and reactances must be added
together vectorially (as vectors), to get
impedance. More about this follows below.
Types of inductors
Inductors used in radio can range from a straight wire at UHF to large chokes and
transformers used for filtering the ripple from the output of power supplies and in audio
amplifiers. Values of inductors range from nano-henries to tens of henries. It is convenient to
group them into three categories.
Air core: to keep losses to a minimum it is necessary to keep the self-resistance of coils as
low as possible.
This means using the thickest possible wire within the space available. Another reason for
using thick wire or even tubing is to reduce the skin effect losses at high frequencies. Direct
current is spread uniformly over the cross-section of the conductor, but alternating current moves
closer to the surface as the frequency increases.
Thus it is necessary to provide a large surface to minimize radio frequency resistance which
is known as skin effect. Inductors used can range from a 25 mm diameter tube for a slot antenna
on VHF to 50 turns of 22 swg wire on a 7.5 cm diameter former for the tank circuit of a 1.8 MHz
transmitter.
The only adjustment available with air core inductors is by tapping all or part of a turn, or
by varying the spacing between turns.
Ferrite or iron dust core: by inserting a ferrite or iron dust core in a coil it is possible to
double its inductance. This means that it is also possible to halve the size of a coil for a given
inductance. If the core is threaded, its position within the coil can be varied to alter the
inductance. Some high-grade communications receivers have a system of cam-operated cores
which are used for tuning. The type of material used for the cores or slugs is of importance and
care must be taken to use the right grade for the right frequency band. This type of coil is used
throughout the HF range, and into the VHF, for low-level signal circuits. Losses in the cores
make them unsuitable for use in power circuits. Values range from a few microhenries to about a
millihenry.
Iron core: this classification includes chokes and transformers, both of which have
laminated iron cores. Transformers are described in the next section. A choke is a single winding
and a transformer has two or more windings. Typical values of inductance for chokes range from
0.1 of a henry to 50 henries.
The transformer
Any two coils magnetically linked will act as transformers. Transformers come in as many
forms as inductors, air or dust cored as well as the more familiar iron-cored type. The iron-core
can take several forms.
The simple transformer comprises two or more
inductors (windings) sharing a common core.
An alternating current is fed to one of the
windings. The operation can explained by
considering the magnetic field of the input
winding, the primary, sweeping through the
secondary winding to induce an AC current in
the secondary. These principles are considered
in AC
The "turns ratio"
A common task for a transformer is to provide an AC supply at a voltage suitable for
rectifying to produce a stated DC output.
The number of turns on each winding determines the output voltage from the transformer.
The output voltage from the secondary is proportional to the ratio of the turns on the windings.
For example, if the secondary has half as many turns as there are on the primary, and 100V
AC is applied to the primary, the output from the secondary will be 50V.
Transformers can be step-up or step-down (in voltage). With twice as many turns on the
secondary as there are on the primary and 100 V applied, the output would be 200V.
The impedance ratio is proportional to the square of the turns ratio. We can use transformers
to change impedances. This property is one of the most important properties in the use of
transformers.
The power output from the secondary winding cannot exceed the power fed into the
primary. Ignoring losses, a step-down in voltage means that an increase in current from that
lower-voltage winding is possible. Similarly, a step-up in voltage means a decrease in the current
output. So the gauge of wire used for the secondary winding may be different to the wire used
for the primary. (The term "gauge of wire" relates to its cross-sectional area.)
Iron-cored transformers are used for audio frequencies and for power supplies. Audio
frequency transformers are designed to give suitable efficiency to frequencies up to 25 kHz. For
speech and domestic quality radio reproduction the core material used is installoy, while the
laminations of high-fidelity transformers are made of (µ) mu-metal The construction is the same
as for chokes and the same considerations of size and power rating apply.
Transformer losses
There are two main types of loss in a transformer, the iron loss and the copper loss. Copper
loss is due to the resistance of the wire used for the windings. Copper loss can be reduced by
using large diameter wire for the windings, but there is a limit to the size and weight and some
copper loss is unavoidable.
One of the principal iron losses is caused by "eddy currents" flowing in the core. The
magnetic circuit (core) can be considered to be a one-turn coil and heavy currents could flow
causing very high losses. To reduce this eddy current loss the core is made up from many thin
slices of iron called laminations which are insulated from each another.
________________________________________
Taken with modifications for educational purposes from
http://www.nzart.org.nz/nzart/examinat/amateur%20radio%20study%20guide/Course%20Files/
Caps%20Inductors%20Resonance/STUDY%20NOTES%20%20CAPACITORS%20INDUCTORS%20&%20RESONANCE.htm
Equations for inductors:
The turning ratio for transformers – I hope I do not need to provide an explicit equation for this!!
For series inductors – we won’t worry about parallel, or cases, in which there is coupling
between inductors [which is when the fun really starts]
Like a capacitor, an inductor's behavior is rooted in the variable of time. Aside from any
resistance intrinsic to an inductor's wire coil (which we will assume is zero for the sake of this
section), the voltage dropped across the terminals of an inductor is purely related to how quickly
its current changes over time. The derivative function of calculus is exhibited in the behavior of
an inductor. In calculus terms, we would say that the induced voltage across the inductor is the
derivative of the current through the inductor: that is, proportional to the current's rate-of-change
with respect to time.
W = 1/2 Li2
V (t ) = i (t ) L
i (t ) =
di
dt
1
V (t )dt
L∫
XL = 2 π f L
L = inductance (H)
v = voltage (V)
W = energy (J)
Inductance is measured in Henry’s – what are Henry’s in SI units? Can you figure it out from the
above equations?
Note that XL is analogous to the Xc introduced in electronics assignment 2.
Problems:
There are no assigned problems for this electronics section.
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